A Multiscale Projection Method for Solving Nonlinear Integral Equations Under the Lipschitz Condition

Authors

Linxiu Fan
Xingjun Luo
Rong Zhang
Chunmei Zeng
Suhua Yang

DOI:

https://doi.org/10.4208/jcm.2202-m2021-0206

Keywords:

Nonlinear integral equations, Multiscale Galerkin method, parameter choice strategy, Gauss-Newton method.

Abstract

We propose a multiscale projection method for the numerical solution of the irtatively regularized Gauss-Newton method of nonlinear integral equations. An a posteriori rule is suggested to choose the stopping index of iteration and the rates of convergence are also derived under the Lipschitz condition. Numerical results are presented to demonstrate the efficiency and accuracy of the proposed method.

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Published

2023-11-08

Issue

Vol. 41 No. 6 (2023)

Section

Articles